On the consistency of the Kozachenko-Leonenko entropy estimate

Abstract

We revisit the problem of the estimation of the differential entropy H(f) of a random vector X in Rd with density f, assuming that H(f) exists and is finite. In this note, we study the consistency of the popular nearest neighbor estimate Hn of Kozachenko and Leonenko. Without any smoothness condition we show that the estimate is consistent (E\|Hn - H(f)|\ 0 as n ∞) if and only if E \ ( \| X \| + 1 )\ < ∞. Furthermore, if X has compact support, then Hn H(f) almost surely.